Cosmological stability in f(φ, G) gravity
Abstract
In gravitational theories where a canonical scalar field φ with a potential V(φ) is coupled to a Gauss-Bonnet (GB) term G with the Lagrangian f(φ, G), we study the cosmological stability of tensor and scalar perturbations in the presence of a perfect fluid. We show that, in decelerating cosmological epochs with a positive tensor propagation speed squared, the existence of nonlinear functions of G in f always induces Laplacian instability of a dynamical scalar perturbation associated with the GB term. This is also the case for f( G) gravity, where the presence of nonlinear GB functions f( G) is not allowed during the radiation- and matter-dominated epochs. A linearly coupled GB term with φ of the form (φ) G can be consistent with all the stability conditions, provided that the scalar-GB coupling is subdominant to the background cosmological dynamics.
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